If you grab my Lazy package from GitHub, your solution is as simple as:

```
Needs["Lazy`"]
LazySource[Fibonacci] ~TakeWhile~ ((# < 1000) &) // List
```

If you want to slightly more literally implement your original description

Conceptually I want to take an infinite list of the natural numbers, map Fib[n] onto it, and then take elements from this list while they are less than n.

you could do it as follows:

```
Needs["Lazy`"]
Fibonacci ~Map~ Lazy[Integers] ~TakeWhile~ ((# < 1000) &) // List
```

To prove that this is completely lazy, try the previous example without the `// List`

on the end. You'll see that it stops with the (rather ugly) form:

```
LazyList[First[
LazyList[Fibonacci[First[LazyList[1, LazySource[#1 &, 2]]]],
Fibonacci /@ Rest[LazyList[1, LazySource[#1 &, 2]]]]],
TakeWhile[
Rest[LazyList[Fibonacci[First[LazyList[1, LazySource[#1 &, 2]]]],
Fibonacci /@ Rest[LazyList[1, LazySource[#1 &, 2]]]]], #1 <
1000 &]]
```

This consists of a `LazyList[]`

expression whose first element is the first value of the expression that you're lazily evaluating and whose second element is instructions for how to continue the expansion.

## Improvements

It's a little bit inefficient to continually call `Fibonacci[n]`

all the time, especially as `n`

starts getting large. It's actually possible to construct a lazy generator that will calculate the current value of the Fibonacci sequence as we stream:

```
Needs["Lazy`"]
LazyFibonacci[a_,b_]:=LazyList[a,LazyFibonacci[b,a+b]]
LazyFibonacci[]:=LazyFibonacci[1,1]
LazyFibonacci[] ~TakeWhile~ ((# < 1000)&) // List
```

Finally, we could generalize this up to a more abstract generating function that takes an initial value for an accumulator, a `List`

of `Rule`

s to compute the accumulator's value for the next step and a `List`

of `Rule`

s to compute the result from the current accumulator value.

```
LazyGenerator[init_, step_, extract_] :=
LazyList[Evaluate[init /. extract],
LazyGenerator[init /. step, step, extract]]
```

And could use it to generate the Fibonacci sequence as follows:

```
LazyGenerator[{1, 1}, {a_, b_} :> {b, a + b}, {a_, b_} :> a]
```

isa real question now ("How can I do this in Mathematica?)". Voting to reopen – belisarius Dec 23 '12 at 1:30